About the Project

.世界杯广告词吃的_『网址:68707.vip』2019蓝男世界杯杯_b5p6v3_g8ms0qwso

AdvancedHelp

Your search matched, but the results seem poor.

Did you mean .世界杯广告词吃的_『网址:687.vii』2019蓝男世界杯杯_b5p6v3_g8ms0qwso ?

(0.004 seconds)

10 matching pages

1: Richard A. Askey
 2019) was Professor Emeritus in the Department of Mathematics at the University of Wisconsin-Madison. … Askey was presented a Lifetime Achievement Award in Recognition and Appreciation for his Outstanding Work and Leadership in the Field of Special Functions at the International Symposium on Orthogonal Polynomials, Special Functions and Applications in Hagenberg, Austria on July 24, 2019. …
2: Bonita V. Saunders
In 2019 she was named a Fellow of the Washington Academy of Sciences. …
3: 3.1 Arithmetics and Error Measures
The current floating point arithmetic standard is IEEE 754-2019 IEEE (2019), a minor technical revision of IEEE 754-2008 IEEE (2008), which was adopted in 2011 by the International Standards Organization as ISO/IEC/IEEE 60559. …
4: DLMF Project News
error generating summary
5: Bibliography I
  • IEEE (2019) IEEE International Standard for Information Technology—Microprocessor Systems—Floating-Point arithmetic: IEEE Std 754-2019. The Institute of Electrical and Electronics Engineers, Inc..
  • 6: 19.11 Addition Theorems
    19.11.6_5 R C ( γ δ , γ ) = 1 δ arctan ( δ sin θ sin ϕ sin ψ α 2 1 α 2 cos θ cos ϕ cos ψ ) .
    7: Bibliography N
  • C. J. Noble (2004) Evaluation of negative energy Coulomb (Whittaker) functions. Comput. Phys. Comm. 159 (1), pp. 55–62.
  • 8: Bibliography B
  • P. L. Butzer and T. H. Koornwinder (2019) Josef Meixner: his life and his orthogonal polynomials. Indag. Math. (N.S.) 30 (1), pp. 250–264.
  • 9: Errata
    Version 1.0.25 (December 15, 2019)
  • Section 3.1

    In ¶IEEE Standard (in §3.1(i)), the description was modified to reflect the most recent IEEE 754-2019 Floating-Point Arithmetic Standard IEEE (2019). In the new standard, single, double and quad floating-point precisions are replaced with new standard names of binary32, binary64 and binary128. Figure 3.1.1 has been expanded to include the binary128 floating-point memory positions and the caption has been updated using the terminology of the 2019 standard. A sentence at the end of Subsection 3.1(ii) has been added referring readers to the IEEE Standards for Interval Arithmetic IEEE (2015, 2018).

    Suggested by Nicola Torracca.

  • Version 1.0.24 (September 15, 2019)
    Version 1.0.23 (June 15, 2019)
    Version 1.0.22 (March 15, 2019)
    10: 18.2 General Orthogonal Polynomials
    For further details see Meixner (1934), Sheffer (1939), Rota et al. (1973) and Butzer and Koornwinder (2019). …